Zariski dense discontinuous surface groups for reductive symmetric spaces
Abstract
Let be a homogeneous space of reductive type with non-compact . The study of deformations of discontinuous groups for was initiated by T.~Kobayashi. In this paper, we show that a standard discontinuous group admits a non-standard small deformation as a discontinuous group for if is isomorphic to a surface group of high genus and its Zariski closure is locally isomorphic to . Furthermore, we also prove that if is a symmetric space and admits some non virtually abelian discontinuous groups, then contains a Zariski-dense discrete surface subgroup of high genus acting properly discontinuously on . As a key part of our proofs, we show that for a discrete surface subgroup of high genus contained in a reductive group , if the Zariski closure of is locally isomorphic to , then admits a small deformation in whose Zariski closure is a reductive subgroup of the same real rank as .
Cite
@article{arxiv.2309.08331,
title = {Zariski dense discontinuous surface groups for reductive symmetric spaces},
author = {Kazuki Kannaka and Takayuki Okuda and Koichi Tojo},
journal= {arXiv preprint arXiv:2309.08331},
year = {2025}
}
Comments
33 pages. Comments are welcome!